Topicm1215be099b02c5e7_1528449000663_0Topic

Point symmetry

Levelm1215be099b02c5e7_1528449084556_0Level

Third

Core curriculumm1215be099b02c5e7_1528449076687_0Core curriculum

IX. Analytic geometry on the cartesian plane. The student:

7) identifies the images of circles and polygons in axial symmetries with respect to the axis of the coordinate system, the centre symmetry (symmetry about the centre of the coordinate system).

Timingm1215be099b02c5e7_1528449068082_0Timing

45 minutes

General objectivem1215be099b02c5e7_1528449523725_0General objective

Interpreting and operating information presented in the text, both mathematical and popular science texts, as well as in the form of graphs, diagrams, tables.

Specific objectivesm1215be099b02c5e7_1528449552113_0Specific objectives

1. Calculating the coordinates of points symmetric with respect to axes of the coordinate system.

2. Creating figures symmetric with respect to axes of the coordinate system.

3. Communicating in English, developing basic mathematical, computer and scientific competences, developing learning skills.

Learning outcomesm1215be099b02c5e7_1528450430307_0Learning outcomes

The student:

- calculates the coordinates of points symmetric with respect to axis of the coordinate system,

- creates figures symmetric with respect to axis of the coordinate system.

Methodsm1215be099b02c5e7_1528449534267_0Methods

1. Discussion.

2. Flipped classroom.

Forms of workm1215be099b02c5e7_1528449514617_0Forms of work

1. Inividual work.

2. Group work.

Lesson stages

Introductionm1215be099b02c5e7_1528450127855_0Introduction

The teacher introduces the subject of the lesson - calculating the coordinates of points symmetric with respect to axes of the coordinate system and creating figures symmetric with respect to axes of the coordinate system.

At home students revise ways of creating the image of the point in the symmetrysymmetrysymmetry with respect to a line.

Procedurem1215be099b02c5e7_1528446435040_0Procedure

Flipped classroom.

The teacher asks chosen students to give coordinates of points symmetric with respect to:

a) axisaxisaxis X for points A (3, 6), B (-5, 2), C (-3, -1),

b) axisaxisaxis Y for points A (3, 6), B (-5, 2), C (-3, -1).

Discussion – can we formulate general rules for determining the coordinates of points symmetric about axes of the coordinate system?

The conclusion to sum‑up the discussion:

- By transforming point A (x, y) in symmetrysymmetrysymmetry about axisaxisaxis X we obtain the point A' (x, -y).

- By transforming point A (x, y) in symmetry about axisaxisaxis Y we obtain the point A' (-x, y).

Task
Students work individually, using computers. Their task is to create a polygonpolygonpolygon symmetric with respect to axisaxisaxis X to a given polygonpolygonpolygon. They practice this skills on many examples.

[Geogebra applet]

Students use obtained information in exercises.

Task
There are points A (2, 0) and B (-1, 3). Determine coordinates of points symmetric to points A and B with respect to axis X. Which point did not change its position?m1215be099b02c5e7_1527752256679_0There are points A (2, 0) and B (-1, 3). Determine coordinates of points symmetric to points A and B with respect to axis X. Which point did not change its position?

Task
There is a triangle ABC whose apexes are A (2, -5), B (-2, 1) and C (3, 6). Give coordinates of apexes of the triangle symmetric to the given one with respect to:

a) axisaxisaxis X,

b) axisaxisaxis Y.

Draw the ABC triangle and its image in the coordinate system.

Task
The point S (0, 4) is the centre of a circle whose radiusradiusradius is 2.

a) Draw an image of the circle in symmetrysymmetrysymmetry about axisaxisaxis X.

b) Give coordinates of the centre and the length of the radiusradiusradius of the drawn circle.

An extra task:
Axis Y is the axis of symmetry of the rectangle ABCD in which A (3, 4) and C (-2, -3).
a) Give coordinates of the other apexes of the rectangle.
b) Calculate its area.m1215be099b02c5e7_1527752263647_0An extra task:
Axis Y is the axis of symmetry of the rectangle ABCD in which A (3, 4) and C (-2, -3).
a) Give coordinates of the other apexes of the rectangle.
b) Calculate its area.

Lesson summarym1215be099b02c5e7_1528450119332_0Lesson summary

Students do the revision exercises.

Then together they sum‑up the classes, by formulating the conclusions to memorise.

- By transforming point A (x, y) in symmetrysymmetrysymmetry about axisaxisaxis X we obtain the point A' (x, -y).

- By transforming point A (x, y) in symmetrysymmetrysymmetry about axisaxisaxis Y we obtain the point A' (-x, y).

Selected words and expressions used in the lesson plan

axisaxisaxis

polygonpolygonpolygon

radiusradiusradius

rectanglerectanglerectangle

symmetrysymmetrysymmetry